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Using Sin-1 or inverse sin in python

Here is my code:

# point of intersection between opposite and hypotenuse

x,y  =    pygame.mouse.get_pos()

# using formula for length of line

lenline1 = (x-x)**2 + (300-y)**2
lenline2 = (x-700)**2 + (y-300)**2

opposite = math.sqrt(lenline1)

adjacent = math.sqrt(lenline2)

# Converting length of lines to angle

PQ = opposite/adjacent
k = math.sin(PQ)
j = math.asin(k)


I'm not getting the results I expected, although after messing around with it I got close but it wasn't quite right. Could someone please tell me what I'm doin wrong. I have two lines: opposite and adjacent And I wish to get the angle using the inverse of sin. What am I doing wrong. I'm only a beginner so don't give too detailed info. I can't imagine this is hard to do.


I am trying to get the angle where the hypotenuse and adjacent meet !!

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marked as duplicate by BrenBarn, Mat, nneonneo, Daniel Martin, Martijn Pieters Sep 15 '12 at 9:36

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

Please don't repeat your questions. –  Mat Sep 15 '12 at 9:17
Don't re-ask the same question. If you feel like your previous version of this question wasn't accurate or didn't get the responses you wanted, edit it and make it better. –  BrenBarn Sep 15 '12 at 9:18
Also "(x-x)" in "lenline1 = (x-x)^2 + (300-y)^2" is probably not what you want, because it's always 0 ;-) –  septi Sep 15 '12 at 9:18
Exponentiation in Python is written ** not ^. –  martineau Sep 15 '12 at 9:20
@septi: It also might just be a way of documenting that the line goes from (x,y) to (x,300), i.e. that the x coordinate does not change. –  nneonneo Sep 15 '12 at 9:23

1 Answer 1

^ in Python means exclusive or, not exponentiation. If you want exponentiation, use the ** operator.

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I changed "^" to "**" and yes, it made a difference but still not the right answer. As Septi stated (x-x)**2 returns as 0 no matter what. Maybe this is an error I made using the formula, but I can't be sure. –  Gregory Peck Sep 15 '12 at 9:22

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